A non-overlapping domain decomposition for low-frequency time-harmonic Maxwell’s equations in unbounded domains

The performances of the non-overlapping domain decomposition method for the time-harmonic Maxwell equations which was originally proposed by Bruno Despres are dramatically improved by means of a new transmission operator, arising from the nonreflecting boundary condition theory, and of a new iterati

## Abstract Consider a bounded domain Ω surrounded by a perfect conductor and containing a conducting cavity __D__. The behaviour of the solutions of the time harmonic Maxwell problem as frequency tends to 0 is analysed in this situation. Necessary and sufficient conditions on the excitations are g

## Abstract A hybrid method for solution of Maxwell's equations of electromagnetics in the frequency domain is developed as a combination between the method of moments and the approximation in physical optics. The equations are discretized by a Galerkin method and solved by an iterative block Gauss

We suggest a linear nonconforming triangular element for Maxwell's equations and test it in the context of the vector Helmholtz equation. The element uses discontinuous normal fields and tangential fields with continuity at the midpoint of the element sides, an approximation related to the Crouzeix-

In this paper, we present some improvements, in terms of accuracy and speed-up, for a particular well adapted Discontinuous Galerkin method devoted to the time-domain Maxwell equations. First, to reduce spurious modes on very distorted meshes, the addition of dissipative terms as penalization in the